Quantum cluster realization for projected stated SLn-skein algebras

Abstract

We introduce a quantum cluster algebra structure Aω(S) inside the skew-field fractions Frac(Sω(S)) of the projected stated SLn-skein algebra Sω(S) (the quotient of the reduced stated SLn-skein algebra by the kernel of the quantum trace map) for any triangulable pb surface S without interior punctures. To study the relationships among the projected SLn-skein algebra Sω(S), the quantum cluster algebra Aω(S), and its quantum upper cluster algebra Uω(S), we construct a splitting homomorphism for Uω(S) and show that it is compatible with the splitting homomorphism for Sω(S). When every connected component of S contains at least two punctures, this compatibility allows us to prove that Sω(S) embeds into Aω(S) by showing that the stated arcs joining two distinct boundary components of S (which generate Sω(S)) are, up to multiplication by a Laurent monomial in the frozen variables, exchangeable cluster variables. We further conjecture that these exchangeable cluster variables generate the quantum upper cluster algebra Uω(S), which, if true, would imply the equality Sω(S)= Aω(S)= Uω(S).